English

On compositions with $x^2/(1-x)$

Symplectic Geometry 2016-03-18 v1 Commutative Algebra Combinatorics

Abstract

In the past, empirical evidence has been presented that Hilbert series of symplectic quotients of unitary representations obey a certain universal system of infinitely many constraints. Formal series with this property have been called \emph{symplectic}. Here we show that a formal power series is symplectic if and only if it is a formal composite with the formal power series x2/(1x)x^2/(1-x). Hence the set of symplectic power series forms a subalgebra of the algebra of formal power series. The subalgebra property is translated into an identity for the coefficients of the even Euler polynomials, which can be interpreted as a cubic identity for the Bernoulli numbers. Furthermore we show that a rational power series is symplectic if and only if it is invariant under the idempotent M\"{o}bius transformation xx/(x1)x\mapsto x/(x-1). It follows that the Hilbert series of a graded Cohen-Macaulay algebra AA is symplectic if and only if AA is Gorenstein with its a-invariant and its Krull dimension adding up to zero. It is shown that this is the case for algebras of regular functions on symplectic quotients of unitary representations of tori.

Keywords

Cite

@article{arxiv.1404.1022,
  title  = {On compositions with $x^2/(1-x)$},
  author = {Hans-Christian Herbig and Daniel Herden and Christopher Seaton},
  journal= {arXiv preprint arXiv:1404.1022},
  year   = {2016}
}

Comments

15 pages

R2 v1 2026-06-22T03:42:34.259Z